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Main Author: Longla, Martial
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2308.11074
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author Longla, Martial
author_facet Longla, Martial
contents We characterize absolutely continuous symmetric copulas with square integrable densities in this paper. This characterization is used to create new copula families, that are perturbations of the independence copula. The full study of mixing properties of Markov chains generated by these copula families is conducted. An extension that includes the Farlie-Gumbel-Morgenstern family of copulas is proposed. We propose some examples of copulas that generate non-mixing Markov chains, but whose convex combinations generate $ψ$-mixing Markov chains. Some general results on $ψ$-mixing are given. The Spearman's correlation $ρ_S$ and Kendall's $τ$ are provided for the created copula families. Some general remarks are provided for $ρ_S$ and $τ$. A central limit theorem is provided for parameter estimators in one example. A simulation study is conducted to support derived asymptotic distributions for some examples.
format Preprint
id arxiv_https___arxiv_org_abs_2308_11074
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle New copula families and mixing properties
Longla, Martial
Statistics Theory
62G08, 62M02, 60J35
We characterize absolutely continuous symmetric copulas with square integrable densities in this paper. This characterization is used to create new copula families, that are perturbations of the independence copula. The full study of mixing properties of Markov chains generated by these copula families is conducted. An extension that includes the Farlie-Gumbel-Morgenstern family of copulas is proposed. We propose some examples of copulas that generate non-mixing Markov chains, but whose convex combinations generate $ψ$-mixing Markov chains. Some general results on $ψ$-mixing are given. The Spearman's correlation $ρ_S$ and Kendall's $τ$ are provided for the created copula families. Some general remarks are provided for $ρ_S$ and $τ$. A central limit theorem is provided for parameter estimators in one example. A simulation study is conducted to support derived asymptotic distributions for some examples.
title New copula families and mixing properties
topic Statistics Theory
62G08, 62M02, 60J35
url https://arxiv.org/abs/2308.11074